Average Nikolskii factors for random trigonometric polynomials
Abstract
For 1 p,q ∞, the Nikolskii factor for a trigonometric polynomial T a is defined by Np,q(T a)=\|T a\|q\|T a\|p,\ \ T a(x)=a1+Σnk=1(a2k2 kx+a2k+12 kx). We study this average Nikolskii factor for random trigonometric polynomials with independent N(0,σ2) coefficients and obtain that the exact order. For 1≤ p<q<∞, the average Nikolskii factor is order degree to the 0, as compared to the degree 1/p-1/q worst case bound. We also give the generalization to random multivariate trigonometric polynomials.
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